Title :
Subquadratic space complexity Gaussian normal basis multipliers over GF(2m) based on Dickson–Karatsuba decomposition
Author :
Jeng-Shyang Pan ; Chiou-Yng Lee ; Yao Li
Author_Institution :
Coll. of Inf. Sci. & Eng., Fujian Univ. of Technlolgy, China
Abstract :
Gaussian normal basis (GNB) of the even-type is popularly used in elliptic curve cryptosystems. Efficient GNB multipliers could be realised by Toeplitz matrix-vector decomposition to realise subquadratic space complexity architectures. In this study, Dickson polynomial representation is proposed as an alternative way to represent an GNB of characteristic two. The authors have derived a novel recursive Dickson-Karatsuba decomposition to achieve a subquadratic space-complexity parallel GNB multiplier. By theoretical analysis, it is shown that the proposed subquadratic multiplier saves about 50% bit-multiplications compared with the corresponding subquadratic GNB multiplication using Toeplitz matrix-vector product approach.
Keywords :
Gaussian processes; Toeplitz matrices; computational complexity; matrix decomposition; public key cryptography; recursive estimation; vectors; Dickson polynomial representation; Gaussian normal basis multipliers; Toeplitz matrix-vector decomposition; bit-multiplications; elliptic curve cryptosystems; even-type; parallel GNB multiplier; recursive Dickson-Karatsuba decomposition; subquadratic space complexity architectures;
Journal_Title :
Circuits, Devices Systems, IET
DOI :
10.1049/iet-cds.2014.0276
